Understanding Complex Numbers and Their Properties

Exercises have a clear solution path, while problems require deeper thinking.

Problems are easier than exercises.

Exercises are always more beneficial than problems.

Problems have a fixed number of steps to solve.

The arguments of the complex numbers must be equal.

The moduli of the complex numbers must be equal.

The complex numbers must be in rectangular form.

The complex numbers must be real numbers.

Polar form

Rectangular form

Exponential form

Trigonometric form

The arguments remain unchanged.

The arguments are added.

The arguments are divided.

The arguments are subtracted.

The arguments are multiplied.

The arguments are added, not multiplied.

The complex numbers are in polar form.

The moduli are different.

The sum is always negative.

The sum is always zero.

The sum is always positive.

There is no ready-made result for the sum.

Complex numbers 2 and 3

Complex numbers 1 and i

Complex numbers 1 and -1

Complex numbers i and -i